Branching annihilating random walk on random regular graphs
Abstract
The branching annihilating random walk is studied on a random graph whose sites have uniform number of neighbors (z). The Monte Carlo simulations in agreement with the generalized mean-field analysis indicate that the concentration decreses linearly with the branching rate for z 4 while the coefficient of the linear term becomes zero if z=3. These features are described by a modified mieb-field theory taking explicitly into consideration the probability of mutual annihilation of the parent and its offspring particles using the returning features of a single walker on the same graph.
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